Metamath Proof Explorer

Theorem cvmd

Description: The covering property implies the modular pair property. Lemma 7.5.1 of MaedaMaeda p. 31. (Contributed by NM, 21-Jun-2004) (New usage is discouraged.)

		Ref	Expression
	Assertion	cvmd	\|- ( ( A e. CH /\ B e. CH /\ ( A i^i B ) A MH B )

Proof

Step	Hyp	Ref	Expression
1		ineq1	\|- ( A = if ( A e. CH , A , ~H ) -> ( A i^i B ) = ( if ( A e. CH , A , ~H ) i^i B ) )
2	1	breq1d	\|- ( A = if ( A e. CH , A , ~H ) -> ( ( A i^i B ) ( if ( A e. CH , A , ~H ) i^i B )
3		breq1	\|- ( A = if ( A e. CH , A , ~H ) -> ( A MH B <-> if ( A e. CH , A , ~H ) MH B ) )
4	2 3	imbi12d	\|- ( A = if ( A e. CH , A , ~H ) -> ( ( ( A i^i B ) A MH B ) <-> ( ( if ( A e. CH , A , ~H ) i^i B ) if ( A e. CH , A , ~H ) MH B ) ) )
5		ineq2	\|- ( B = if ( B e. CH , B , ~H ) -> ( if ( A e. CH , A , ~H ) i^i B ) = ( if ( A e. CH , A , ~H ) i^i if ( B e. CH , B , ~H ) ) )
6		id	\|- ( B = if ( B e. CH , B , ~H ) -> B = if ( B e. CH , B , ~H ) )
7	5 6	breq12d	\|- ( B = if ( B e. CH , B , ~H ) -> ( ( if ( A e. CH , A , ~H ) i^i B ) ( if ( A e. CH , A , ~H ) i^i if ( B e. CH , B , ~H ) )
8		breq2	\|- ( B = if ( B e. CH , B , ~H ) -> ( if ( A e. CH , A , ~H ) MH B <-> if ( A e. CH , A , ~H ) MH if ( B e. CH , B , ~H ) ) )
9	7 8	imbi12d	\|- ( B = if ( B e. CH , B , ~H ) -> ( ( ( if ( A e. CH , A , ~H ) i^i B ) if ( A e. CH , A , ~H ) MH B ) <-> ( ( if ( A e. CH , A , ~H ) i^i if ( B e. CH , B , ~H ) ) if ( A e. CH , A , ~H ) MH if ( B e. CH , B , ~H ) ) ) )
10		ifchhv	\|- if ( A e. CH , A , ~H ) e. CH
11		ifchhv	\|- if ( B e. CH , B , ~H ) e. CH
12	10 11	cvmdi	\|- ( ( if ( A e. CH , A , ~H ) i^i if ( B e. CH , B , ~H ) ) if ( A e. CH , A , ~H ) MH if ( B e. CH , B , ~H ) )
13	4 9 12	dedth2h	\|- ( ( A e. CH /\ B e. CH ) -> ( ( A i^i B ) A MH B ) )
14	13	3impia	\|- ( ( A e. CH /\ B e. CH /\ ( A i^i B ) A MH B )